Dualizable link homology

Abstract

We modify our previous construction of link homology in order to include a natural duality functor F. To a link L we associate a triply-graded module HXY(L) over the graded polynomial ring R(L)=C[x1,y1,…,x,y]. The module has an involution F that intertwines the Fourier transform on R(L), F(xi)=yi, F(yi)=xi. In the case when =1 the module is free over R(L) and specialization to x=y=0 matches with the triply-graded knot homology previously constructed by the authors. Thus we show that the corresponding super-polynomial satisfies the categorical version of q 1/q symmetry. We also construct an isotopy invariant of the closure of a dichromatic braid and relate this invariant to HXY(L).